A Low-Dimensional Counterexample to the HK-Conjecture
Abstract
We provide a counterexample to the HK-conjecture using the flat manifold odometers constructed by Deeley. Deeley's counterexample uses an odometer built from a flat manifold of dimension 9 and an expansive self-cover. We strengthen this result by showing that for each dimension d≥ 4 there is a counterexample to the HK-conjecture built from a flat manifold of dimension d. Moreover, we show that this dimension is minimal, as if d≤ 3 the HK-conjecture holds for the associated odometer. We also discuss implications for the stable and unstable groupoid of a Smale space.
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